Add to ORKGWe investigate the dynamics of exponential maps z 7 → λez; the goal is a description by means of dynamic rays. We discuss landing properties of dynamic rays and show that in many important cases, repelling and parabolic periodic points are landing points of periodic dynamic rays. For postsingularly finite exponential maps, we use spi-der theory to show that a dynamic ray lands at the singular value
We study the distribution of periodic points for a wide class of maps, namely entire transcendental ...
Summary. We introduce and study monotone periodic mappings acting on real func-tions with linear gro...
Abstract. We present an elementary and conceptual proof that the complex expo-nential map is chaotic...
We investigate the dynamics of exponential maps z->e^z ; the goal is a description by means of dynam...
For the family of exponential maps z -> exp(z) + k, we show the following analog of a theorem of Dou...
We will show that repelling periodic points are landing points of periodic rays for exponential maps...
This thesis contains several new results about the dynamics of exponential maps $z\mapsto \exp(z)+\k...
We study some aspects of the iteration of an entire map f over the complex plane ℂ. In many settings...
The Douady-Hubbard landing theorem for periodic external rays is one of the cornerstones of the stud...
We study some aspects of the iteration of an entire map f over the complex plane ℂ. In many settings...
We study some aspects of the iteration of an entire map f over the complex plane ℂ. In many settings...
The emphDouady-Hubbard landing theorem for periodic external rays is one of the cornerstones of the ...
The points which converge to ∞ under iteration of the maps z↦λexp(z) for λ ∈ C/{0} are investigated....
The points which converge to ∞ under iteration of the maps z↦λexp(z) for λ ∈ C/{0} are investigated....
The Douady-Hubbard landing theorem for periodic external rays is one of the cornerstones of the stud...
We study the distribution of periodic points for a wide class of maps, namely entire transcendental ...
Summary. We introduce and study monotone periodic mappings acting on real func-tions with linear gro...
Abstract. We present an elementary and conceptual proof that the complex expo-nential map is chaotic...
We investigate the dynamics of exponential maps z->e^z ; the goal is a description by means of dynam...
For the family of exponential maps z -> exp(z) + k, we show the following analog of a theorem of Dou...
We will show that repelling periodic points are landing points of periodic rays for exponential maps...
This thesis contains several new results about the dynamics of exponential maps $z\mapsto \exp(z)+\k...
We study some aspects of the iteration of an entire map f over the complex plane ℂ. In many settings...
The Douady-Hubbard landing theorem for periodic external rays is one of the cornerstones of the stud...
We study some aspects of the iteration of an entire map f over the complex plane ℂ. In many settings...
We study some aspects of the iteration of an entire map f over the complex plane ℂ. In many settings...
The emphDouady-Hubbard landing theorem for periodic external rays is one of the cornerstones of the ...
The points which converge to ∞ under iteration of the maps z↦λexp(z) for λ ∈ C/{0} are investigated....
The points which converge to ∞ under iteration of the maps z↦λexp(z) for λ ∈ C/{0} are investigated....
The Douady-Hubbard landing theorem for periodic external rays is one of the cornerstones of the stud...
We study the distribution of periodic points for a wide class of maps, namely entire transcendental ...
Summary. We introduce and study monotone periodic mappings acting on real func-tions with linear gro...
Abstract. We present an elementary and conceptual proof that the complex expo-nential map is chaotic...